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ICS 278: Data Mining Lecture 7: Regression Algorithms

ICS 278: Data Mining Lecture 7: Regression Algorithms. Padhraic Smyth Department of Information and Computer Science University of California, Irvine. Notation. Variables X, Y….. with values x, y (lower case) Vectors indicated by X Components of X indicated by X j with values x j

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ICS 278: Data Mining Lecture 7: Regression Algorithms

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  1. ICS 278: Data MiningLecture 7: Regression Algorithms Padhraic Smyth Department of Information and Computer Science University of California, Irvine Data Mining Lectures Lecture 7: Regression Padhraic Smyth, UC Irvine

  2. Notation • Variables X, Y….. with values x, y (lower case) • Vectors indicated by X • Components of X indicated by Xj with values xj • “Matrix” data set D with n rows and p columns • jth column contains values for variable Xj • ith row contains a vector of measurements on object i, indicated by x(i) • The jth measurement value for the ith object is xj(i) • Unknown parameter for a model = q • Can also use other Greek letters, like a, b, d, g • Vector of parameters = q Data Mining Lectures Lecture 7: Regression Padhraic Smyth, UC Irvine

  3. Example: Multivariate Linear Regression • Task: predict real-valued Y, given real-valued vector X • Score function, e.g., S(q) = Si[y(i)– f(x(i) ; q)]2 • Model structure: f(x ; q) = a0 + Saj xj • Model parameters = q = {a0, a1, …… ap} Data Mining Lectures Lecture 7: Regression Padhraic Smyth, UC Irvine

  4. S = S e2 = e’ e = (y – X a)’ (y – X a) • = y’ y – a’ X’ y – y’ X a + a’ X’ X a • = y’ y – 2 a’ X’ y + a’ X’ X a • Taking derivative of S with respect to the components of a gives…. • dS/da = -2X’y + 2 X’ X a • Set this to 0 to find the extremum (minimum) of S as a function of a… • - 2X’y + 2 X’ X a = 0 • X’Xa = X’ y Letting X’X = C, and X’y = b, we have C a = b, i.e., a set of linear equations We could solve this directly by matrix inversion, i.e., a = C-1 b = ( X’ X )-1 X’ y …. but there are more numerically-stable ways to do this (e.g., LU-decomposition) Data Mining Lectures Lecture 7: Regression Padhraic Smyth, UC Irvine

  5. Comments on Multivariate Linear Regression • prediction is a linear function of the parameters • Score function: quadratic in predictions and parameters • Derivative of score is linear in the parameters • Leads to a linear algebra optimization problem, i.e., Ca = b • Model structure is simple…. • p-1 dimensional hyperplane in p-dimensions • Linear weights => interpretability • Useful as a baseline model • to compare more complex models to Data Mining Lectures Lecture 7: Regression Padhraic Smyth, UC Irvine

  6. Limitations of Linear Regression • True relationship of X and Y might be non-linear • Suggests generalizations to non-linear models • Complexity: • O(p3) - could be a problem for large p • Correlation/Collinearity among the X variables • Can cause numerical instability (C may be ill-conditioned) • Problems in interpretability (identifiability) • Includes all variables in the model… • But what if p=100 and only 3 variables are related to Y? Data Mining Lectures Lecture 7: Regression Padhraic Smyth, UC Irvine

  7. Finding the k best variables • Find the subset of k variables that predicts best: • This is a generic problem when p is large(arises with all types of models, not just linear regression) • Now we have models with different complexity.. • E.g., p models with a single variable • p(p-1)/2 models with 2 variables, etc… • 2p possible models in total • Note that when we add or delete a variable, the optimal weights on the other variables will change in general • k best is not the same as the best k individual variables • What does “best” mean here? • Return to this later Data Mining Lectures Lecture 7: Regression Padhraic Smyth, UC Irvine

  8. Search Problem • How can we search over all 2p possible models? • exhaustive search is clearly infeasible • Heuristic search is used to search over model space: • Forward search (greedy) • Backward search (greedy) • Generalizations (add or delete) • Think of operators in search space • Branch and bound techniques • This type of variable selection problem is common to many data mining algorithms • Outer loop that searches over variable combinations • Inner loop that evaluates each combination Data Mining Lectures Lecture 7: Regression Padhraic Smyth, UC Irvine

  9. Empirical Learning • Squared Error score (as an example: we could use other scores) S(q) = Si[y(i)– f(x(i) ; q)]2 where S(q) is defined on the training data D • We are really interested in finding the f(x; q) that best predicts y on future data, i.e., minimizing E [S] = E [y– f(x ; q)]2 • Empirical learning • Minimize S(q) on the training data Dtrain • If Dtrain is large and model is simple we are assuming that the best f on training data is also the best predictor f on future test data Dtest Data Mining Lectures Lecture 7: Regression Padhraic Smyth, UC Irvine

  10. Complexity versus Goodness of Fit Training data y x Data Mining Lectures Lecture 7: Regression Padhraic Smyth, UC Irvine

  11. Complexity versus Goodness of Fit Too simple? Training data y y x x Data Mining Lectures Lecture 7: Regression Padhraic Smyth, UC Irvine

  12. Complexity versus Goodness of Fit Too simple? Training data y y x x Too complex ? y x Data Mining Lectures Lecture 7: Regression Padhraic Smyth, UC Irvine

  13. Complexity versus Goodness of Fit Too simple? Training data y y x x Too complex ? About right ? y y x x Data Mining Lectures Lecture 7: Regression Padhraic Smyth, UC Irvine

  14. Complexity and Generalization Score Function e.g., squared error Stest(q) Strain(q) Complexity = degrees of freedom in the model (e.g., number of variables) Optimal model complexity Data Mining Lectures Lecture 7: Regression Padhraic Smyth, UC Irvine

  15. Defining what “best” means • How do we measure “best”? • Best performance on the training data? • K = p will be best (i.e., use all variables) • So this is not useful • Note: • Performance on the training data will in general be optimistic • Alternatives: • Measure performance on a single validation set • Measure performance using multiple validation sets • Cross-validation • Add a penalty term to the score function that “corrects” for optimism • E.g., “regularized” regression: SSE + l sum of weights squared Data Mining Lectures Lecture 7: Regression Padhraic Smyth, UC Irvine

  16. Using Validation Data Use this data to find the best q for each model fk(x ; q) Training Data • Use this data to • calculate an estimate of Sk(q) for each fk(x ; q) and • select k* = arg mink Sk(q) Validation Data Data Mining Lectures Lecture 7: Regression Padhraic Smyth, UC Irvine

  17. Using Validation Data Use this data to find the best q for each model fk(x ; q) Training Data • Use this data to • calculate an estimate of Sk(q) for each fk(x ; q) and • select k* = arg mink Sk(q) Validation Data Use this data to calculate an unbiased estimate of Sk*(q) for the selected model Test Data Data Mining Lectures Lecture 7: Regression Padhraic Smyth, UC Irvine

  18. Using Validation Data can generalize to cross-validation…. Use this data to find the best q for each model fk(x ; q) Training Data • Use this data to • calculate an estimate of Sk(q) for each fk(x ; q) and • select k* = arg mink Sk(q) Validation Data Use this data to calculate an unbiased estimate of Sk*(q) for the selected model Test Data Data Mining Lectures Lecture 7: Regression Padhraic Smyth, UC Irvine

  19. 2 different (but related) issues here • 1. Finding the function f that minimizes S(q) for future data • 2. Getting a good estimate of S(q), using the chosen function, on future data, • e.g., we might have selected the best function f, but our estimate of its performance will be optimistically biased if our estimate of the score uses any of the same data used to fit and select the model. Data Mining Lectures Lecture 7: Regression Padhraic Smyth, UC Irvine

  20. Non-linear models, linear in parameters • We can add additional polynomial terms in our equations, e.g., all “2nd order” terms f(x ; q) = a0 + Saj xj + Sbij xi xj • Note that it is a non-linear functional form, but it is linear in the parameters (so still referred to as “linear regression”) • We can just treat the xi xj termsas additional fixed inputs • In fact we can add in any non-linear input functions!, e.g. f(x ; q) = a0 + Saj fj(x) Comments: • Exact same linear algebra for optimization (same math) • Number of parameters has now exploded -> greater chance of overfitting • Ideally would like to select only the useful quadratic terms • Can generalize this idea to higher-order interactions Data Mining Lectures Lecture 7: Regression Padhraic Smyth, UC Irvine

  21. Non-linear (both model and parameters) • We can generalize further to models that are nonlinear in all aspects f(x ; q) = a0 + Sak gk(bk0 +Sbkj xj) where the g’s are non-linear functions with fixed functional forms. In machine learning this is called a neural network In statistics this might be referred to as a generalized linear model or projection-pursuit regression For almost any score function of interest, e.g., squared error, the score function is a non-linear function of the parameters. Closed form (analytical) solutions are rare. Thus, we have a multivariate non-linear optimization problem (which may be quite difficult!) Data Mining Lectures Lecture 7: Regression Padhraic Smyth, UC Irvine

  22. Optimization of a non-linear score function • We seek the minimum of a function in d dimensions, where d is the number of parameters (d could be large!) • There are a multitude of heuristic search techniques (see chapter 8) • Steepest descent (follow the gradient) • Newton methods (use 2nd derivative information) • Conjugate gradient • Line search • Stochastic search • Genetic algorithms • Two cases: • Convex (nice -> means a single global optimum) • Non-convex (multiple local optima => need multiple starts) Data Mining Lectures Lecture 7: Regression Padhraic Smyth, UC Irvine

  23. Other non-linear models • Splines • “patch” together different low-order polynomials over different parts of the x-space • Works well in 1 dimension, less well in higher dimensions • Memory-based models y’ = S w(x’,x) y, where y’s are from the training dataw(x’,x) = function of distance of x from x’ • Local linear regressiony’ = a0 + Saj xj , where the alpha’s are fit at prediction time just to the (y,x) pairs that are close to x’ Data Mining Lectures Lecture 7: Regression Padhraic Smyth, UC Irvine

  24. To be continued in Lecture 8 Data Mining Lectures Lecture 7: Regression Padhraic Smyth, UC Irvine

  25. Suggested Reading in Text • Chapter 4: • General statistical aspects of model fitting • Pages 93 to 116, plus Section 4.7 on sampling • Chapter 5: • “reductionist” view of learning algorithms (can skim this) • Chapter 6: • Different forms of functional forms for modeling • Pages 165 to 183 • Chapter 8: • Section 8.3 on multivariate optimization • Chapter 9: • linear regression and related methods • Can skip Section 11.3 Data Mining Lectures Lecture 7: Regression Padhraic Smyth, UC Irvine

  26. Useful References N. R. Draper and H. Smith, Applied Regression Analysis, 2nd edition, Wiley, 1981 (the “bible” for classical regression methods in statistics) T. Hastie, R. Tibshirani, and J. Friedman, Elements of Statistical Learning, Springer Verlag, 2001 (statistically-oriented overview of modern ideas in regression and classificatio, mixes machine learning and statistics) Data Mining Lectures Lecture 7: Regression Padhraic Smyth, UC Irvine

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